What is the domain and range of g(x) =(5x)/(x^2-36)?

1 Answer
Jim G.
Feb 10, 2018

x inRR,x!=+-6
y inRR,y!=0

Explanation:

The denominator of g(x) cannot be zero as this would make g(x) undefined. Equating the denominator to zero and solving gives the values that x cannot be.

"solve "x^2-36=0rArr(x-6)(x+6)=0

rArrx=+-6larrcolor(red)" are excluded values"

rArr"domain is "x inRR,x!=+-6

"or in interval notation as"

(-oo,-6)uu(-6,6)uu(6,+oo)

"for range divide terms on numerator/denominator by the"
"highest power of x that is "x^2

g(x)=((5x)/x^2)/(x^2/x^2-36/x^2)=(5/x)/(1-36/x^2)

"as "xto+-oo,g(x)to0/(1-0)

rArry=0larrcolor(red)"is an excluded value"

rArr"range is "y inRR,y!=0

(-oo,0)uu(0,+oo)larrcolor(blue)"in interval notation"
graph{(5x)/(x^2-36) [-10, 10, -5, 5]}

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